spectral and wavefunction statistics (ii) v.e.kravtsov, abdus salam ictp
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Spectral and Wavefunction Statistics (II)
V.E.Kravtsov,Abdus Salam ICTP
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Wavefunction statistics Porter-Thomas distribution
Wavefunction statistics in one-dimensionalAnderson model
Weak multifractality in 2D disordered conductors
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Wavefunction statistics and Coulomb peaks heights
RL
RLg
rdr
FERL
2
)( |)(|Contact
area
Bunching
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Porter-Thomas distribution
-follows from random matrix theory
-describes local distribution of wavefunction intensity in chaotic systems
-fails to describe the “web” pattern
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The Anderson model
arrrrr VH ,','
ˆ
i
)( if
2/W 2/W
1D: all states are localized with localization length W
3D: Anderson localization transition at W=16.5
2D: all states are localized with exponentially large localization radius ~exp(-a/W )
2
2
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Distribution of eigenfunction amplitude for 1D Anderson model
yyL
yyP exp)||()( 2)1(
Porter-Thomas:
Take =2then the distribution for 1D Anderson model can be considered as limit of the Porter-Thomas distribution.
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Poisson distribution as a of the Wigner surmise
2
2
16exp
]exp[ No surprise that the limit of Porter-Thomas
gives the distribution of localized functions in one
dimension.
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Distribution of wavefunction amplitude in 2D conductors (L
)/(ln4
1exp)( 2 gxgxP
1)/ln(/2|| 0222 lLDgLx
)(ln xP
x
Porter-Thomas
Porter-Thomas with corrections
g g
Log-normal
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Sample dimension from local measurement
2|)(| r
2DQuasi 1D
2|)(| rx
)(ln xP Porter-Thomas
Porter-Thomas with corrections
g g
Log-normal in 2D:
Stretch-exponential in quasi-1D
)/(ln4
1exp)( 22 gxLgxP
]2exp[ xA
Zero-dimensional
quantum dot
V2||
For g>>1 RMT behavior for a typical wavefunction
Dimension-specific behavior for large
amplitudes
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Where the RMT works
)(ln xP Porter-Thomas
Porter-Thomas with corrections
g gV2||
1,/
2),/ln(/)/ln()/ln(/2 )(0
2
dL
dlLllLDg
o
g>>1For dynamic
phenomena g
D
LLgg ),()(Diffusion displacement for time 1/
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qqdq
gq
qqq LLLx
2
0
12
22||
Weak multifractality in 2D conductors
)/(ln4
1exp)( 2 gxg
x
dxdxxP 22|| Lx
0
2g
qdq
12 0
20 Dg
2=dimensionality of space
q-dependent multifractal dimensionality
Magnetic field makes fractality
weaker
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Fractal dimension of this map decreases with increasing the level=“multi”-fractality
Multifractality: qualitative picture
Map of the regions where exceeds the chosen
level
Arbitrary chosen level Weight of the
dark blue regions scales
like
HdLHd